Enhancing chemical reactions

ABSTRACT

Methods of enhancing selected chemical reactions. The population of a selected high vibrational energy state of a reactant molecule is increased substantially above its population at thermal equilibrium by directing onto the molecule a beam of radiant energy from a laser having a combination of frequency and intensity selected to pump the selected energy state, and the reaction is carried out with the temperature, pressure, and concentrations of reactants maintained at a combination of values selected to optimize the reaction in preference to thermal degradation by transforming the absorbed energy into translational motion. The reaction temperature is selected to optimize the reaction. 
     Typically a laser and a frequency doubler emit radiant energy at frequencies of ν and 2ν into an optical dye within an optical cavity capable of being tuned to a wanted frequency δ or a parametric oscillator comprising a non-centrosymmetric crystal having two indices of refraction, to emit radiant energy at the frequencies of ν, 2ν, and δ (and, with a parametric oscillator, also at 2ν-δ). Each unwanted frequency is filtered out, and each desired frequency is focused to the desired radiation flux within a reaction chamber and is reflected repeatedly through the chamber while reactants are fed into the chamber and reaction products are removed therefrom.

CROSS REFERENCE TO RELATED APPLICATION

This application is a continuation in part of application Ser. No. 307,380, filed Nov. 17, 1972, now abandoned.

BACKGROUND OF THE INVENTION

The advent of powerful frequency-modulated infrared lasers brings into practical possibility the activation of chemical reactions by vibrational excitation. Because such reactions will involve systems with vibrational states out of thermal equilibrium, reactions may also be induced which are not normally observed. Furthermore, solid state reactions may be affected at cryogenic temperatures and equilibria may be displaced significantly by optical pumping. This paper examines the conditions necessary for infrared-laser-activated reactions. Appropriate experimental conditions are predicted.

One of the important applications of infrared lasers may well be the activation of highly selective chemical reactions and the study of their fundamental dynamics. Although initial success is likely to occur with gaseous reactions, liquid and solid reactions may follow. Isotopic separation may also be made highly selective by this technique.

Excitation by infrared lasers is fundamentally different than excitation by high energy lasers in the visible or u.v. range, the latter causing electronic transitions, usually with secondary energy transitions to the translational and vibrational degrees of freedom in a somewhat random fashion. Excitation by infrared places energy in the vibrational modes in a selective fashion, giving rise to the possibility of highly selective reactions.

We began to seriously consider the possibility of using infrared lasers for chemical activation over five years ago. However, at that time, the number of available infrared laser frequencies was severely limited and the techniques for modulation were not sufficiently advanced for our needs as we saw them then. Now a wide range of infrared laser frequencies can be generated and laser systems which can be tuned over wide frequency ranges are commercially available.

Practical modulation rates of these systems are still slow for this application, but it is conceivable that in the not-too-distant future frequency modulation over a wide range may be accomplished in nanosecond times. This will allow infrared cascading to be used to generate excited vibrational states resulting in larger populations than would be obtainable under thermal equilibrium conditions at thousands of degrees, under which conditions, of course, the simplest molecule would be torn apart.

Apparently the first experimental paper which describes laser infrared activation of a chemical reaction can be attributed to Borde et al who used a CO₂ laser to excite and react SF₆, C₂ H₄, C₃ H₆, and PH₃..sup.(1) Mayer et al.sup.(2) used a continuous-wave hydrogen fluoride laser to successfully separate deuterium from hydrogen by specific activation of the reaction of methanol with bromine. Russian workers at the Lebedev Physics Institute, also known to be working in the field, have reported laser induced reactions with N₂ F₄, BCl₃, SiH₄, and SF₆ which proceed at explosive rates..sup.(3)

We seriously considered the possibility of using infrared lasers for chemical activation in 1965. However, at that time, the number of available infrared laser frequencies was severely limited and the techniques for tuning were not sufficiently advanced for our needs as we saw them then, when we envisioned the need for a laser capable of being tuned over an appreciable range in a nanosecond. Now, in 1974, a wide range of infrared laser frequencies can be generated and laser systems which can be tuned over wide frequency ranges are commercially available. Practical modulation rates of these systems are still slow for this application, but it is expected that tuning over a wide enough frequency range may soon be accomplished in short enough times to minimize the effect of collisional process by cascading molecules into highly excited vibrational states in shorter than collision times. Such a capability will allow chemists and physicists to measure single vibrational and rotational relaxation processes definitively and to measure in detail the contribution of specific vibrational and rotational states to chemical reactions.

Infrared lasers already have been used in the study of vibrational relaxation times for some simple molecules..sup.(8,39,40) They have been used in conjunction with molecular beam experiments to elucidate the importance of vibrational energy in chemical reactions. .sup.(41) Some preliminary experiments have also been reported which verify that infrared lasers can markedly enhance chemical reactions even when competing collisional processes are important..sup.(1,2,42)

A number of recent papers report experiments and theory bearing on the general question of relaxation processes within the molecule, many of which must be considered as competitors to the actual reaction rate..sup.(43) Both intramolecular and intermolecular processes are important in the prediction of laser reaction enhancement. Considerable emphasis has been given to simple molecules in this regard, but little has been reported on vibrational relaxation processes of heavier molecules in the ground electronic state. Until this information is available, the complete potential of laser-enhanced reactions in activating specific chemical bonds cannot be completely assessed. Selective reactions for simple molecules, on the other hand, caused by energy enrichment of specific vibrational modes will most certainly produce products not normally observed under thermally equilibrated conditions.

Our approach has been to develop a mathematical formulation which, when used along with molecular dynamic measurements, can predict the rate enhancement caused by appropriately tuned lasers. The development follows the method used in transition state theory. It does not incorporate either the adiabatic condition nor does its usage depend upon the thermal equilibrium approximation, although it is derived from consideration of conditions of thermal equilibrium.

All molecules have characteristic vibrational frequencies. Their bonding is partly covalent and partly ionic, and all reactions which result in formation of new products involve breaking of bonds through extension of the distance between atoms within the molecule. The extension is a function of the vibrational excitation of the molecule, so the principles and techniques of this invention are applicable to all molecules. When the spectroscopy is known, excitation schemes can be developed and reaction conditions can be specified for production of specific compounds.

Efficient and easily employed conditions typically involve multiple excitation of a given molecule using one laser frequency, on a time scale that is short by comparison with the average time between molecular collisions.

An important objective of our latest activity is to select and experimentally measure the laser-enhanced reaction of a simple system which can be used to determine the predictive accuracy of the previously developed theory. The simplest systems involve molecules with only one degree of vibrational freedom where intramolecular relaxations do not occur. Hence, reactions involving diatomics are attractive.

SUMMARY OF THE INVENTION

A typical method according to the present invention for enhancing a selected chemical reaction comprises increasing the population of a selected high vibrational energy state of a reactant molecule substantially above its population at thermal equilibrium by directing onto the molecule a beam of radiant energy from a laser having a combination of frequency and intensity selected to pump the selected energy state, and carrying out the reaction with the temperature, pressure, and concentrations of reactants maintained at a combination of values selected to optimize the reaction in preference to thermal degradation by transforming the absorbed energy into translational motion. The reaction temperature preferably is selected to optimize the reaction as determined by equation (44). (The equations and table referred to in this summary appear in the description of preferred embodiments.)

Photons are excited from one energy level either to the next higher energy level or to a level above the next higher energy level. In the latter case, radiant energy is provided having a plurality of selected frequencies, either by a plurality of lasers or by a laser tuned rapidly from one selected frequency to another, typically from higher to lower frequencies corresponding to the vibrational energy levels of the molecule being excited, to successively populate higher vibrational levels of the molecule. The laser should be tuned at a rate comparable to those of the dynamic processes within the molecule leading to depopulation.

The laser intensity preferably is selected to provide substantially the minimum expenditure of energy per mole of product. Where the reaction is bimolecular, being representable as 2A → B + C, the laser intensity I_(opt) preferably is substantially the value determined by equation (45), and the concentration of the reactant [A_(in) ] is substantially as determined by equation (16). Where the reaction is unimolecular, being representable as A → B, the laser intensity I_(opt) preferably is substantially the value determined by equation (45) where C₄ has substantially the value determined by equation (47). Where the reaction is unimolecular, being representable as A → B, the Arrehenius frequency factor is about 10¹² to 10¹⁵, and the temperature during the reaction is about 300 to 700° K, the laser intensity I_(opt) preferably has substantially the value obtained or interpolated from the applicable curve or curves in FIGS. 11, 12, or 13 of the drawings.

In a typical method for enhancing a bimolecular reaction, the reaction is driven beyond the equilibrium point by the factor φ_(AB) in accordance with equation (9g).

Where the method is used for enhancing a bimolecular reaction listed in Table III, it is preferred that E_(act), A, k_(2fe), ΔS_(p), ΔH, k_(2fe) φ_(AB), and E_(x) have approximately the respective values listed in Table III, or interpolated therefrom, for the reaction pressure and temperature.

If rotational equilibrium is rapidly attained, S in equation (9c') does not include the rotational energy levels. This increases the magnitude of ξ, and thus the enhancement of the reaction.

In a typical method according to this invention, a laser and a frequency doubler emit radiant energy at frequencies of ν and 2ν into an optical dye within an optical cavity capable of being tuned to a wanted frequency δ or a parametric oscillator comprising a non-centrosymmetric crystal having two indices of refraction to emit radiant energy at the frequencies of ν, 2ν, and δ (and, with a parametric oscillator, also at 2ν-δ). These frequencies are adjusted to desired values by selection of the lasing materials, by tuning of the optical cavities, and by controlling the temperature of the parametric oscillator. Typically each unwanted frequency is filtered out, and each desired frequency is focused to the desired radiation flux within a reaction chamber and is reflected repeatedly through the chamber while reactants are fed into the chamber and reaction products are removed therefrom.

In a typical method for enhancing the reaction of HCl with NO to yield the HNO dimer, a neodymium doped yttria garnet laser provides radiant energy at a frequency of about 10565 cm⁻¹, the radiation frequency is doubled to about 21130 cm⁻¹, the doubled frequency radiant energy is passed through a crystal of lithium niobate at a temperature of about 350° C and oriented to emit radiant energy at frequencies of about 2924 cm⁻¹ and 18206 cm⁻¹, and the radiant energy at about 10565 cm⁻¹ and 2924 cm⁻¹ is directed to the reactants.

In another typical method NO is excited to the 5th vibrational state by radiant energy at a frequency of about 1814.6 cm⁻¹ as illustrated in FIG. 15.

BRIEF DESCRIPTION OF THE DRAWINGS

FIGS. 1-13 are graphs illustrating various features of the present invention as follows:

FIG. 1 -- Enhancement ratio for the reaction 2NH₃ (g) → H₂ (g). The upper curve for a given symbol represents calculations with the collision efficiency f_(AA) =10⁻³ ; the lower curve, f_(AA) = 1. Each curve represents an enhancement ratio for a laser flux as indicated. Steady state power was assumed.

FIG. 2 -- The calculated effect of several variables on the laser-enhanced reaction 2NH₃ → N₂ H₄ + H₂. The upper curve for a given symbol represents calculations where the collision efficiency was taken to be 10⁻³. The lower curve represents f_(AA) = 1.

FIG. 3 -- Expenditure of laser energy per mole of product as a result of laser excitation. Upper curves with the same symbol are calculated assuming collisional efficiencies f_(AA) = 1; lower curve, f_(AA) = 10⁻³.

FIG. 4 -- Pulsed laser reaction enhancement of 2NH₃ → N₂ H₄ +H₂. P_(o) = 1 atm, T = 500° K, k₄ = 1 × 10⁵, t = 0.1, ρ = 10⁹, f_(AA) = 10⁻³, Ψ(0,5) → Ψ(2,7) → Ψ(4,9). Initial energy expenditure per mole = 1.9 × 10⁷ KWH/Mole.

FIG. 5 -- Same as FIG. 4 except k₄ = 10⁷ sec⁻¹. Initial energy expenditure per mole of product = 1.3 × 10⁸ KWH per mole of product.

FIG. 6 -- Same as FIG. 4 except k₄ = 10⁹ sec⁻¹. Initial energy expenditure per mole of product = 6.2 × 10¹¹

FIG. 7 -- Same as FIG. 5 except ρ = 10¹² watts/cm². Initial energy expenditure per mole of product = 3.5 × 10⁹.

FIG. 8 -- Hypothetical Reaction 2A → C + D where molecular parameters are the same as NH₃. P_(o) = 1 atm, T = 500° K, k₄ = 10⁷, ε = 0.1, ρ = 10⁹, f_(AA) = 10⁻³, ΔG_(f) = 30 Kcal/mole, ΔG_(b) = 10 Kcal/mole. Initial energy expenditure = 3.0 KWH/mole.

FIG. 9 -- Expected energy expenditure for gaseous bimolecular reactions, T = 300° K

FIG. 10 -- Same as FIG. 9 except at 700° K

FIG. 11 -- Energy Expenditure and Optimum Laser Intensity vs the Arrehenius Frequency Factor. Typical Molecular Constants Used: F_(A) = 500, ν_(i) = 3500 cm⁻¹, B = 5 cm⁻¹ ; D_(A) = 3.5A, F_(AA) = 10⁻³ ; μ 28; εi(ν_(i)) = 10³, k₄ = 10⁷, ν's = 500, 1000, 2000, 3000, 3500 with degeneracy 2, 3, 4, 4, 5, respectively. T = 300° K.

FIG. 12 -- Same as FIG. 11 except T = 500° K.

FIG. 13 -- Same as FIG. 11 except T = 700° K.

FIG. 14 is a schematic view of typical apparatus for use in practicing the present invention.

FIG. 15 is an energy diagram illustrating an example of multiple level excitation by a single laser frequency in accordance with this invention.

FIG. 16 is an energy diagram illustrating an example of excitation by a pair of selected radiation frequencies.

DESCRIPTION OF PREFERRED EMBODIMENTS

Consider for illustrative purposes a simple bimolecular reaction A+B→C+D where the reaction rate is conventionally expressed as ##EQU1## where [X_(t) ] represents the total concentration of component X, including populations in all of its energy states. The subscript e, designates thermal equilibrium. According to the well known absolute rate theory .sup.(3) the reaction rate of equation (1) can be written as ##EQU2## where [C_(t) ] represents the concentration of the activated complex and κkT/h is the frequency of passing over the activation barrier along the reaction coordinate. Combining equations (1) and (2) gives the result ##EQU3## where V is the molar volume. ##EQU4## where F_(X) is the gaseous molecular partition function divided by Avogadro's number, we obtain ##EQU5## Since for perfect gases F_(X) can be written F_(X) ^(') V, where V is to be found in the translational partition function, it follows that ##EQU6## Likewise, ##EQU7## Because ##EQU8## where g_(iX) designates the multiplicity of state i of molecule X, we can also write ##EQU9## which will be useful in later derivations.

Equation (4) takes into account the contribution of all energy states to the forward reaction only if the system is in thermal equilibrium. Of course, high-intensity laser pumping of vibrational states will dramatically disturb the equilibrium between resonant states, rendering equation (4) inappropriate.

To formulate a non-equilibrium expression we shall consider all energy states of components A and B as competing reactants, i.e., ##EQU10##

Using the principle of detailed balancing of equation (7), we can write ##EQU11## where F_(i)α = g_(i)α /V. When ε_(of) < ε_(jB) +ε_(iA), k_(ijk) no longer increases exponentially with energy of the excited levels, a fact which must be reflected in (8). We thus write ##EQU12## where MIN(α,β) indicates the lesser of α or β. This equation assumes equilibrium between species A_(i), B_(j) and C_(k) but not necessarily total equilibrium between all states. Thus it will be applicable, at least to a resonable approximation, to a laser-activated system.

If we further assume k_(ijk) to be constant, i.e., κ' = κ_(ijk), and take into account that the high limit of reaction rate is determined by collisional frequency, we can write ##EQU13## where ε' _(of) = ε _(of) + kTln[MIN(1,γ_(ijk))]. The constant γ_(ijk) is related to the collisional rate constant k_(3AB) /f_(AB), i.e., ##EQU14## for rare exceptions, is greater than unity for all values of i,j,k.

Using equation (3a) we can rewrite (9): ##EQU15## where ##EQU16##

Evaluation of κ'

The constant κ' can be evaluated under conditions of complete equilibrium when equation (5) can be used and φ_(AB) = 1: ##EQU17## When γ_(ijk) >1, κ' can be written as κ' = κ/S where ##EQU18##

The term Ω_(B) (ε'_(of) - ε_(iA)) is largest when ε_(iA) =ε'_(of) and under these conditions, ##EQU19## Thus Ω_(B) can be ignored for all cases except when there is a laser-excited level equal to or greater than ε_(of). To this approximation then ##EQU20## Thus we can rewrite φ_(AB) as ##EQU21## For non-thermally equilibrated systems we can express φ_(AB) as ##EQU22## where e refers to summation over equilibrated states and n, non-equilibrated states. It is easy to show that ξ ##EQU23## approaches unity to a high degree of approximation if n_(i) and n_(j) are small compared to the total number of levels available in the system. For any experiment with a finite number of fixed-frequency lasers, this approximation will be quite precise. Thus we can express (9f) as a summation of four terms:

    φ.sub.AB = 1 +φ.sub.ne + φ.sub.en + φ.sub.nn. (9g)

The second term can be written ##EQU24## where σ_(i) (ε) is the number of energy levels of molecule i between 0 and ε, β is the symmetry factor and n_(i) is the total number of levels displaced from thermal equilibrium. When A and B are the same molecule, β=2; otherwise β=1. If no levels above ε'_(of) are displaced from thermal equilibrium, the second Σ term vanishes. Expanding eqn (9h) and using eqn (9d), we obtain ##EQU25## The term Ω_(B) (ε'_(of) - ε_(iA)) is largest when ε_(iA) =ε _(of) and under these conditions, ##EQU26## Unless one of the laser-excited levels is equal to or greater than ε'_(of), Ω_(B) can be ignored.

The third term, φ_(en), is obtained by interchanging B and j with A and i in equation (9j).

The fourth term is expressed by ##EQU27## where p>i if A=B and p=o if A ≠ B.

It is important at this point to remark that if A and B do not represent the same entity then one must contend with reactions of the type

    A + A .sup.k.sbsp.A E+ F

as well as

    A + B .sup.k2fe C + D.

unless k_(A) << k_(2fe), the first reaction will also be enhanced.

To obtain σ₆₀ (ε) we consider the vibrational and rotational levels in particular. Although the translational levels are large they will be ignored because thermal equilibrium of translational levels are large they will be ignored because thermal equilibrium of translational levels is not disturbed. Let nv_(k) be the number of vibrational levels of vibrator k between 0 and ε'_(of). The quantum mechanical relations for the rotational level j associated with the vibrational state ik is given by

    J.sub.jik (J.sub.jik + 1) = ε.sub.jik /B.          (11)

where B is the rotational constant.

The number of levels associated with the i^(th) level of the k^(th) vibrator therefore becomes ##EQU28##

The number of levels associated with the k^(th) vibrator is ##EQU29##

The total number of levels becomes ##EQU30## where n is the number of fundamental frequencies of degeneracy g_(k).

It is obvious from equation (9c) that the overall reaction rate can be enhanced tremendously, provided upper states [A_(i) ] and [B_(j) ] can be significantly populate above thermal equilibrium, because each concentration term is multiplied by an exponential energy term. Several lasers tuned to ##EQU31## and ##EQU32## could simultaneously populate A_(i) and B_(j) levels. For selective reactions involving isotope separation, however, it is only advantageous to activate the isotope-containing reactant.

It is now possible to define in quantitative terms an enhancement ratio E_(r) as the ratio of equation (9b) combined with equation (1), to (2), i.e., ##EQU33## If the reaction is negligible E_(r) = φ_(AB). If all levels are at thermal equilibrium E_(r) is unity.

Consider now the pumping of a vibrational mode of A by a laser tuned to the appropriate frequency ν_(i). There are a number of rate processes which must be considered:

    ______________________________________                                          ##STR1##      induced adsorption increasing energy in one degree of                          freedom)                                                         ##STR2##      (reaction by the pumped molecule)                                ##STR3##      (reaction by equilibrated molecules)                             ##STR4##      (degradation to thermal energy by collision-M.sub. α                     represents all                                                                 molecules, including A and B)                                    ##STR5##      (induced emission)                                               ##STR6##      (internal energy redistributed by  interaction at a                            distance)                                                        ##STR7##      (spontaneous emission)                                           ##STR8##      (collisional population of state i).                            ______________________________________                                    

Determination of φ_(AB) and A_(in) Under Steady State Approximation i-l,i i,i-l i-l,i i,i-l

If A is excited by a continuous laser, it is appropriate to use the steady state approximation which, upon taking the above processes into consideration, gives rise to ##EQU34## where ρ(ν_(i)) = I(ν_(i))/cδν, I(ν_(i)) being the energy flux of laser radiation at frequency ν_(i) ; B_(i-l),i = B_(i),i-l is Einstein's coefficient of induced absorption; A_(i-l),i is Einstein's coefficient of spontaneous emission which is related to B_(i),i-l by the relation ##EQU35## B_(i),i-1 is given by ##EQU36## where M_(q) is the dipole operator and ν_(i) is a frequency expressed in wavenumbers.

The constants k_(3A)α are second order rate constants for the transfer of vibrational to translational energy upon collision of the laser-excited molecule with the α^(th) molecular species of the molecular mixture. They can be expressed as ##EQU37## where f_(A)α = fraction of collisions with α which cause deactivation of A

D_(i) = diameter of the i^(th) species molecule in Angstroms

β_(A)α = collision symmetry factor (2 for A=α collisions, 1 for A≠α collisions)

μ_(A)α = reduced mass of the collision entity in gms/mole.

The term k_(2A).sbsb.i_(B) [B_(t) ] can be obtained from the following considerations. ##EQU38## where k_(ijk) is expressed in equation (8a). Thus ##EQU39## which results in ##EQU40## where ε = ε'_(of) - ε_(ia) by the same arguments used above.

To a good approximation k_(5i) can be obtained through consideration of the collisional process under equilibrium conditions, i.e. when ρ(ν_(i)) ˜ 0, and A_(i), i-1 is neglected ##EQU41## Hence ##EQU42## which is negligible for most cases.

The constant k_(4i) is the most uncertain of the parameters in eqn (16). How it varies with the vibrational level i is an interest currently being investigated..sup.(5-8) The explanation of unimolecular reactions is closely tied to this question. The early formulations of unimolecular rate theory by Rice, Ramsberger and Kassell assumed a molecular model of coupled oscillators, giving rise to fast intramolecular redistribution of energy i.e., k_(4i) ≳ 10¹² sec⁻¹. Slater challenged this assumption and proposed that the internal degrees of freedom should be treated as a set of m orthogonal oscillators whose coupling would be hindered largely by selection rules. Hence, for his model k_(4i) would be small..sup.(9)

The major theoretical and experimental efforts have dealt with the decay from excited vibrational states within an electronically excited state and there seems to be mounting evidence that the vibrational relaxation rate within the excited electronic state is less than 10⁻¹¹ sec except for some isolated molecules, SF₆.sup.(10) being an example. Those molecules whose vibronic absorption spectra indicate discrete vibrational modes are likely to be in the catogory with SF₆.

Dynamics of vibrational relaxation in molecules in the ground electronic state appear in general to be slower. Moore.sup.(11) describes laser-monitored experiments where the intramolecular vibrational transitions are slow enough to be collision-dependent.

From these measurements we can establish upper bounds for the constant k_(4i). For example:

    CO.sub.2 (O 0°1)(assym) → CO.sub.2 (nm.sup.l O) ; k.sub.4i < 1.5×10.sup.4 sec.sup.-1

    CH.sub.4 (assym) → CH.sub.4 (o) ; k.sub.4i < 4.1×10.sup.4 sec.sup.-1

    CH.sub.4 (assym) → CH.sub.4 (sym) ; k.sub.4i < 8.7 sec.sup.-1

Lifetimes are not available for decay from single levels i > 1.

However to a crude approximation it appears that we can write ##EQU43## where f_(ij) is unity if the i^(th) and j^(th) vibrational levels belong to the same irreducible representation; otherwise, f_(ij) ˜0.1. As the energy of the i^(th) vibrator increases, more summation terms become important because the density of states close to the state i increases. It is obvious that rotational levels close to E_(i) will equilibrate much faster than will vibrational levels but this will be of minor consequence in the enhancement of vibrationally excited molecules. When the density of states around E_(i) becomes large, k_(4i) can become larger than k_(3A)α [M₆₀ ].

The mass balance equation ##EQU44## where n_(A) is the number of levels out of equilibrium, can be used with eqn (16) to obtain values of [A_(in) ].

The constant B_(i-1), i can be expressed in terms of the traditional molar absorptivity in l/mole cm according to the expression derived by considering an element of volume of unit area in cm² with a length of Δx cm. The light absorption in this element is given by ##EQU45## and since ##EQU46## is negligible under equilibrium conditions for large energy differences, as is A_(i),i-1 [A_(i) ]. We can write where ##EQU47## Integrating, we obtain ##EQU48## where L is the length of the cell. According to the Beer-Lambert law, ##EQU49## so that ##EQU50## where ε_(i-1),i is in units of l mole⁻¹ cm⁻¹ and I in joules/cm² sec.

APPLICATIONS

For illustrative purposes let us consider the possibility of bimolecularly reacting NH₃ + NH₃ → N₂ H₄ + H₂ by laser activation to two excited levels. Conventionally, hydrazine is prepared either by oxidation of ammonia by sodium hypochlorite followed by reaction with NaOH.sup.(12) or reduction by chemical or electrochemical means of compounds containing N--N linkages,.sup.(13) such as nitrites or hyponitrites. Direct reaction of NH₃ to form N₂ H₄ in chemical equilibrium has not been demonstrated. Provided temperature can be kept low, perhaps such a reaction could be demonstrated.

Since thermodynamic parameters needed for the algorithm which employs the equations developed above have not been experimentally determined, they must be estimated. They are summarized with the following equilibria, the first and second being activation equilibria. Data for the third reaction were obtained from the J.A.N.A.F. thermodynamic tables. Numbers are for 1 mole N₂ H₆ or N₂ H₄, all reactants and products being gaseous:

    ______________________________________                                         2NH.sub.3 → N.sub.2 H.sub.6.sup.+.sup.+                                              ΔH.sub.f.sup.+.sup.+ = 46.4 Kcal/mole                                    N.sub.2 H.sub.6.sup.+.sup.+                                                    ΔS.sub.f.sup.+.sup.+ = -34 cal/deg mole N.sub.2                          H.sub.6.sup.+.sup.+                                               N.sub.2 H.sub.4 + H.sub.2 → N.sub.2 H.sub.6.sup.+.sup.+                              ΔH.sub.b.sup.+.sup.+ = 15.6 Kcal/mole                                    N.sub.2 H.sub.6.sup.+.sup.+                                                    ΔS.sub.b.sup.+.sup.+ = -31.38 cal/deg mole N.sub.2                       H.sub.6.sup.+.sup.+                                               2NH.sub.3 → N.sub.2 H.sub.4 + H.sub.2                                                ΔH = 30.8 Kcal/mole N.sub.2 H.sub.4                                      ΔS = -2.62 cal/deg mole N.sub.2 H.sub.4                     ______________________________________                                          ΔH.sub.f was empirically estimated as 27% of the energy needed to      break two N--H bonds; ΔS.sub.f ws chosen to be consistent with the      experimental fact that N.sub.2 H.sub.4 does not decompose at 300° K      but does at 600° K. Δ H.sub.b, and ΔS.sub.b were      obtained from the first and third equilibria.

Calculation of enhancement ratios requires evaluation of eqn's (9g-9i). The rotational level having the greatest population at 300° K can be calculated from the formula ##EQU51## where B is the rotational constant (B = 9.941cm⁻¹). We thus consider the following transitions

    Ψ(n.sub.1 = 0, J.sub.m) → Ψ(n.sub.1 = 2, J.sub.m = 2)

    Ψ(n.sub.1 = 2, J.sub.m + 2) → Ψ(n.sub.1 = 4, J.sub.m + 4)

where

    g.sub.iA = (2J.sub.m + 4i + 1).sup.2

    ε.sub.iA = (J.sub.m + 2i)(J.sub.m + 2i + 1)B

and

    ν.sub.o = 0, v.sub.1 (2ν.sub.1) ≅ 6600 ν.sub.2 (4ν.sub.1) ≅ 13,050

It will be assumed that all other levels are at thermal equilibrium.

The constants γ_(ijk) are derived from eqns (9a) and (16c) where D_(NH).sbsb.3 ≅ 1.15A, and μ = 8.5 gm/mole. The minimum value of γ_(ijk), i.e., γ_(ooo), is given by ##EQU52## and since 1/κ' = 3.4 × 10⁶ (see Table I below), γ_(ooo) is greater than unity for all values of ijk over the temperature range of interest. Thus ε'_(of) = ε_(of).

We have considered the 2ν₁ vibrational excitation of NH₃ instead of the ν₁ excitation which has associated with it a much larger molar absorptivity but this is more than offset by the exponential dependence on the energy of excitation. The collision efficiency factor is difficult to predict. Since it may vary by several orders of magnitude, we will choose 1, 10⁻ 1 , 10⁻³ to determine its effect.

Using eqns (9d) and (14) for κ', including fundamental physical constants for NH₃,.sup.(7) and equation (16c) for k_(3Ai) along with the estimated thermodynamics data, we obtain the parameters indicated in Table I.

                  TABLE I                                                          ______________________________________                                         Calculated Parameters for the Reaction                                         2NH.sub.3 → N.sub.2 H.sub.4 + H.sub.2                                   T° K                                                                          1/k' × 10.sup.-6                                                                    k.sub.2fe l/m sec                                                                         F.sub.NH.sbsb.3                                                                       ε.sub.of                                                                      J.sub.m                              ______________________________________                                         300   3.43       8.9 × 10.sup.-28                                                                     72.7  16004  4                                    400   3.48       4.5 × 10.sup.-19                                                                    117.4  15935  5                                    500   3.52       8.2 × 10.sup.-14                                                                    176.7  15865  5                                    600   3.55       2.8 × 10.sup.-10                                                                    234.5  15796  6                                    700   3.58       1.0 × 10.sup.-7                                                                     357.1  15726  6                                    ______________________________________                                    

The partition function F_(NH3) was calculated using fundamental constants supplied by Herzberg..sup.(14)

Equation (9h) can be used to obtain φ_(en) = φ_(ne).

Since ε_(1A) and ε_(2A) are less than ε_(of) but ε_(1A) +ε_(2A) > ε_(of) eqn. (10) becomes ##EQU53## when one rotational level is pumped. Equations (16), when simultaneously solved result in ##EQU54## For simplicity, we assume ε (ν₁) = ε(ν₂) so that

    B.sub.1,2 ρ(ν.sub.2) = ν.sub.1 /ν.sub.2 B.sub.o,1 ρ(ν.sub.1)                                         (31)

(See eqn. 22).

FIG. 1 summarizes various calculated enhancement ratios using equations for φ_(AA) developed above. An attempt has been made to illustrate the effects of temperature, collision efficiency, concentration of reactants and laser intensity. FIG. 2 is perhaps more useful than FIG. 1 in that it shows directly the calculated rate of bimolecular reaction as a function of the same variables. Reactions at three temperatures are summarized. The conventional bimolecular rates are calculated from estimates of enthalpy and entropy of activation are indicated by the lines at the bottom of each temperature grouping. At high pressures other lines become asymptotic as φ_(AA) approaches unity.

The range of rate enhancement is much greater at lower temperatures. It will also be noticed that the upper limit of reaction rates is about the same irrespective of temperature. Examples at [A_(t) ] 32 10⁻² m/l are 10⁻⁷.5 at 300° K, 10⁻⁶ at 500° K and 10⁻⁵ at 700° K. This suggests that it would be advantageous to effect reactions at as low temperature as possible. High chemical selectivity is more probable at lower temperatures, but, as will be shown later, the energy expenditure may be prohibitive.

The effect of the collision efficiency parameter f_(AA) is also shown in FIG. 2. The upper limit f_(AA) = 1 causes a break from the more favorable curve representing f_(AA) = 10⁻³ at [A_(t) ] = 10⁻⁴ m/l. Reasonable rates might be expected to lie between the limits indicated by the two lines.

The energy expended by a continuous laser in a second's time is given by

    E = I(ν.sub.i)A                                         (32)

where A is the area of the laser beam in cm². The amount of product formed in the same time due to laser enhancement is

    P =  k.sub.2ef [A.sub.t ].sup.2 (φ.sub.AA -1)V × 10.sup.-3 ; (33)

the volume V is AL; L is the length of the cell in cm.

The absorbance of energy is given by

    Ab = ε(ν.sub.1)[A.sub.t ]L                      (34)

assuming a cell long enough to absorb 90% of the energy we obtain ##EQU55## so that ##EQU56## By using the proper conversion factor for KWH we obtain the equation that was used to calculate ordinate values for FIG. 3, namely ##EQU57## being pumped. Note that this equation does not include power inefficiencies in producing the laser nor any estimates of unwanted side reactions other than those considered in the steady state computation of φ_(AA).

The first important result to be gleaned from FIG. 3 is that energy expenditure is much too great to allow the reaction 2NH₃ → N₂ H₄ + H₂ to be considered on a commercial basis. This will not be the case for a large class of reactions, however, which wil be discussed later.

The second point is that to be efficient, one must utilize as much thermal energy as possible. Choice of temperature ideally is to be influenced by consideration of side reactions, always more bothersome at high temperatures, and energy expenditure. More discussion will follow in the section on parametric optimization.

The third point is that there is an optimum laser intensity at certain temperatures and concentrations. To illustrate this, we can examine the curves for 300° K at [A_(t) ] - 10⁻² m/l. We see that energy expenditure decreases from ρ = 10⁵ to 10⁹ but minimizes and increases again from ρ = 10¹¹ to 10¹⁵.

Finally it should be noticed that the value for f_(AA) has a pronounced effect on energy consumption. As it decreases in value energy consumption also decreases in the higher concentration ranges.

Very high powered lasers are not yet available which operate in the continuous mode. Furthermore, unless proper precautions are taken, temperatures may rise abruptly and even explosively, thereby nullifying the advantage of selective reaction. Both of these problems may be minimized by using pulsed lasers.

Non-Steady State Formulation

If a pulsed laser were used for excitation, steady state approximations would not be appropriate. Since the differential equations required for the problem cannot be solved in closed form, let us consider the formulation of a simple computer algorithm for two-laser excitation of a reactant A so that it will react with B (which may be another A) to form a product C + D. We have written more exact algorithms than presented here for the study of various phasing of the laser pulses, modulation, and anharmonicity but they quickly become expensive to execute. As before, we will assume that all quantum states are in thermal equilibrium except those being explicity perturbed by the laser light, i.e. three levels of one of the high energy fundamental modes.

The rate of formation of component [A_(in) ] is given by ##EQU58## An approximation to the temperature change is given by ##EQU59## where C_(p) is the heat capacity of the reactor plus contents (cal/deg) and ε_(iA) is expressed in cal/mole.

By choosing the appropriate Δt such that reasonably small fractional changes result in concentrations [A_(in) ] and 8 B_(jn) ] and [A_(t) ] during any time increment, we can follow the reaction interatively through the equations ##EQU60##

FIGS. 4-8 were calculated using the non-steady state equations derived above and are included to illustrate different points. FIGS. 4-6 demonstrate the effect of the magnitude of the internal rearrangement rate which is expected to be of the order 10⁺⁷ sec⁻¹. For FIG. 4, this rate was assumed to be 10⁵ sec⁻¹. FIG. 5 is thought to represent the more probable case where k₄ = 10⁷. FIG. 6 represents the condition where the internal rearrangement rate is 10⁹ sec⁻¹. It must be pointed out that these figures represent the maximum expected effect since a molecule with a quantum of vibrational energy disbursed among n degrees of freedom should still be more reactive than one in thermal equilibrium, though not as reactive as if the quantum were in one degree of freedom.

It will be noticed from FIG. 4 that the effect of a laser pulse lingers when the internal rearrangement rate is slow. As this rate increases however, the population of excited molecules readjusts rapidly with respect to the pulse time. The rate-enhancement consequently decreases and the energy consumed per mole of product increases in a non linear fashion.

FIG. 7 illustrates the reason for increased energy consumption as the laser intensity is increased. When the upper levels are saturated, there is no net absorption of laser energy, and it passed through unused. What this threshold value is depends, of course, on the other dynamic parameters in equation (38). Since B_(i),i+1 and ρ(ν_(i)) always occur as products, it follows that if ε increases by a factor f, the threshold value of ρ will decrease by the factor 1/f.

FIGS. 4-7 illustrate the fact that pulsed lasers can be used to enhance reactions. In none of the cases calculated was temperature increases a problem. FIG. 8 has been included to illustrate several points of a practical nature. The Gibbs free energy of activation for the hypothetical reaction 2A → C+D was taken to be 30 Kcal/mole and the Gibbs free energy for the reaction was taken to be 20 Kcal/mole. In other words, the Gibbs activation energy for the reverse process is 10 Kcal/mole. At 500° K k_(fe) = 33 moles/1 sec, k_(be) = 7.7 × 10⁵ and [C_(eq) ] = 1.1 × 10⁻⁶ m/l. Fast reactions were chosen so that the effect of approach to equilibrium could be demonstrated in 10 microseconds. The first pulse would create a concentration [C] = 1.9 × 10⁻⁵. In other words, it would push the reaction beyond the equilibrium point. Then during recovery of the laser the back reaction would set in. This suggests that by judicious experimental design it is possible to drive reactions beyond equilibrium, then obtain the kinetics of the back reaction by watching the decay to equilibrium. If the back reaction is slow compared to the laser recovery time or if the laser is operated in the continuous mode, reactions may be driven beyond the equilibrium point by the factor φ_(AB). Table II illustrates this point for the ammonia-hydrazine reaction at various temperatures using both single photon (1-2,2-3) and double photon (1-3,3-5) excitations. In each case, the initial pressure of NH₃ was 1 atm. For double-photon transitions, the laser frequencies were taken to be 6600 cm⁻¹ and 6450 cm⁻¹ ; the second, being an estimate, was lower to account for anharmonicity. For single photon transitions the corresponding frequencies were 3336 cm⁻¹ and 3264 cm⁻¹. The frequency 3335.9 is that of the asymmetric stretch of NH₃. The peak laser output was sufficient to saturate the pumped levels. It will be noticed, for example, that by using two double photon excitations, it appears possible to drive a reaction to virtual completion (0.4 atm N₂ H₄) in 28 sec at 126° C.

                                      TABLE II                                     __________________________________________________________________________     Summary of Theoretical Calculations on the                                     Laser Activated Bimolecular Reaction 2NH.sub.3 → N.sub.2 H.sub.4 +      H.sub.2                                                                                        TEMPERATURE ° C                                                           26.8                                                                                126.8                                                                                226.8                                                                                326.8                                                                                426.8                                 __________________________________________________________________________     Initial Forward Rates                                                                        T 1.5×10.sup.-30                                                                 4.2×10.sup.-22                                                                 4.9×10.sup.-17                                                                 1.2×10.sup.-13                                                                 3.1×10.sup.-11                                 S 3.0×10.sup.-11                                                                 1.7×10.sup.-8                                                                  1.8×10.sup.-8                                                                  9.4×10.sup.-8                                                                  2.9×10.sup.-7                    (m/l sec)     D 8.3×10.sup.-4                                                                  8.2×10.sup.-4                                                                  8.1×10.sup.-4                                                                  8.1×10.sup.-4                                                                  8.0×10.sup.-4                    Equilibrium N.sub.2 H.sub.4                                                    Concentration T 1.3×10.sup.-13                                                                 6.1×10.sup.-11                                                                 2.3×10.sup.-9                                                                  2.6×10.sup.-8                                                                  1.4×10.sup.-7                                  S 5.5×10.sup.-4                                                                  1.2×10.sup.-4                                                                  4.5×10.sup.-5                                                                  2.4×10.sup.-5                                                                  1.3×10.sup.-5                    (m/l)         D 2.0×10.sup.-2                                                                  1.3×10.sup.-2                                                                  5.3×10.sup.-3                                                                  1.9×10.sup.-3                                                                  6.6×10.sup.-4                    Time To 50% Completion                                                                       T 8.6×10.sup.16                                                                  1.4×10.sup.11                                                                  4.8×10.sup.7                                                                   2.2×10.sup.5                                                                   4.6×10.sup.3                                   S 2.1×10.sup.7                                                                   7.9×10.sup.4                                                                   2.7×10.sup.3                                                                   2.6×10.sup.2                                                                   51                                     (sec)         D 1.2×10.sup.2                                                                   28    8.8   2.6   0.94                                   Back Reaction Rate At                                                          Equilibrium Composition                                                                      T 1.5×10.sup.-30                                                                 4.2×10.sup.-22                                                                 4.9×10.sup.-17                                                                 1.2×10.sup.-13                                                                 3.1×10.sup.-11                                 S 2.8×10.sup.-11                                                                 1.6×10.sup.-9                                                                  1.8×10.sup.-8                                                                  1.1×10.sup.-7                                                                  3.2×10.sup.-7                    (m/l sec)     D 3.7×10.sup.-8                                                                  1.8×10.sup.-5                                                                  2.5×10.sup.-4                                                                  6.4×10.sup.-4                                                                  6.4×10.sup.-4                    __________________________________________________________________________      T = Thermally equilibrated conditions                                          S = Single level excitations, i.e., 1→2, 2→3 ψ(0,4)          → ψ(1,5) → ψ(2,6)                                        D = Double level excitations, i.e., 1→3, 3→5 ψ(0,4)          → ψ(2,6) → ψ(4,8)                                  

PARAMETRIC OPTIMIZATION

The foregoing mathematical development incorporates a number of parameters the choices of which are critical to the successful enhancement of chemical reactions by lasers. The concentration of reactants for example should be as high as possible for practical reasons. However, if they are too high, temperature rise may become uncontrollable. The intensity of the laser should be rather high, yet should not exceed a certain maximum, depending of course on the system, temperature and concentration of reactants. The excitation frequencies should be as large as possible consistent with the activation energy. Whether single or double photon excitations are desirable from a point of view of economy of energy expenditure depends also on the activation energy. We are now in a position to derive expressions which can aid in choosing these parameters.

Temperature Control

If the vibrational → translational process (process 1) competes favorably with the reaction

    A* → B (process (2)

the temperature is predicted to increase significantly and in some cases explosively. The rate of temperature increase is given by equation (39). Under conditions of saturation pumping this equation is simplified: ##EQU61## which represents the maximum temperature rise which can be expected. If only A is pumped, n_(B) = 0. Furthermore, V can be suitably approximated by ##EQU62## where J is the toal energy output of the laser per second. Thus ##EQU63## where k_(3A)α [M.sub.α ] is in sec⁻¹, Cp in cal/deg and εA in l/mole cm.

Optimum Laser Intensities and Minimum Energy Expenditures

We define the optimum laser intensity as that intensity which results in the minimum expenditure of energy per mole of product. For complex systems, it is not easily expressible in closed form and must be determined for each case by application of the equations developed in the prior sections. For the simple reaction 2A → B+C optimum laser intensities can be derived by evaluating the condition under which the derivative of eqn (37) is zero. When φ_(AA) >> 1, E_(x) ≅ C₁ I/φ_(AA), φ_(AA) = C₂ [A_(in) ]² and [A_(in) ] = (C₃ [A_(i-iA) ]I+C₄ [A_(ie) ])/(2C₃ I + C₄) where [A_(in) ] is the concentration of the highest level non-thermal state. The coefficients C_(i) are not functions of ρ. It follows that ##EQU64## Since ##EQU65## it follows that ##EQU66## for optimum laser intensities. Evaluation of this equation leads to the expression for the optimum I. To a good approximation, since terms with A_(ie) are negligible compared to terms including A_(oe), ##EQU67## This equation can be substituted into equation (16) to yield a value for the optimum concentration of [A_(in) ]. Assuming that a two level process is in question, we arrive at the values.

    [A.sub.on ] =  9/13[A.sub.oe ]

    [A.sub.in ] = 3/13[A.sub.oe ]

    [A.sub.2n ] =  1/13[A.sub.oe ]

When ε_(1A) < ε_(2A) ≦ε'.sub. of /2 we can approximate φ_(AA) by including only the φ_(nn) term in eqn 9g: ##EQU68##

Finally, by combining the relationship ##EQU69##

where ΔS_(p) is the entropy of activation of standard state 1 atmosphere, and equation (16) with equation (37), we obtain ##EQU70## where E_(x) is expressed in KWH/mole of product. At pressures below 1 atmosphere the term k_(4i) /[A_(t) ] predominates and E_(x) is inversely proportional to [A_(t) ].

FIGS. 9 and 10 have been calculated from equation (46) assuming that the laser exitation frequency is such that ##EQU71## Molecular constants for NH₃ were used but are of relatively minor consequence in the calculation. Both figures are included to illustrate the effect of temperature.

If the laser excitation frequency is such that hν_(i) = ε'_(of) /2 then the term φ_(ne) becomes important: ##EQU72## The effect is large enough to decrease E_(x) by a factor g_(oe) /13g_(2e).

For NH₃ the factor is 0.037.

UNIMOLECULAR REACTIONS

It is clear from Table III that not many bimolecular laser induced reactions will be of economic importance. Only those products of high economic value, such as isotopes, can be seriously considered. As will be seen below, such restrictions do not apply to unimolecular reactions.

The classical Lindemann scheme has been used to explain unimolecular reactions by the mechanism: ##EQU73## where under steady state approximation, ##EQU74## When ##EQU75## The constant k_(lfe) can be expressed as ##EQU76##

                                      Table III                                    __________________________________________________________________________     Approximate Expected Minimal Energy Expenditure for Bimolecular Reactions      at 1 atm and 300° K                                                                            E.sub.act                                                                          A              (a)-ΔS.sub.p.sup.+.sup.+                                                      (b)ΔH.sup.+.sup.+                                                            (c)   (d) E.sub.x              Bimolecular Gaseous Kcal/                                                                              l/mole                                                                              k.sub.2fe at 300° K                                                               eu at                                                                               Kcal/                                                                              k.sub.2fe                                                                            KWH/..sub.AB          Ref.                                                                              Reaction            mole                                                                               sec  l/mole sec                                                                               300° K                                                                       mole                                                                               l/mole                                                                               mole                  __________________________________________________________________________     15 HI + HI → H.sub.2 + I.sub.2                                                                 45.9                                                                               1.6×10.sup.10                                                                 5.9×10.sup.-24                                                                     22.2 43.2                                                                               1.6×10.sup.2                                                                   2×10.sup.5                                                               2                     16 NO.sub.2 + NO.sub.2 → 2NO + O.sub.2                                                         25.1                                                                               7.0×10.sup.8                                                                  3.6×10.sup.-10                                                                     28.4 22.3                                                                               2.4×10.sup.0                                                                   7×10.sup.6                                                               .                     17 NOCl + NOCl → 2NO + Cl.sub.2                                                                25.8                                                                               5.7×10.sup.10                                                                 9.0×10.sup.-9                                                                      19.7 23.0                                                                               5.6×10.sup.2                                                                   4×10.sup.3      18 CO + Cl.sub.2 → COCl + Cl                                                                   51.3                                                                               5.5×10.sup. 9                                                                 2.3×10.sup.-28                                                                     24.3 48.5                                                                               5.4×10.sup.1                                                                   4×10.sup.5      19 H . + O.sub.2 → OH . + O .                                                                  17.0                                                                               1.6×10.sup.8                                                                  6.5×10.sup.-5                                                                      31.4 14.2                                                                               1.6×10.sup.0                                                                   7×10.sup.5      20 Cl . + COCl.sub.2 → Cl.sub.2 + COCl .                                                       20.5                                                                               5.5×10.sup.11                                                                 6.3×10.sup.-4                                                                      15.2 17.8                                                                               5.4×10.sup.3                                                                   2×10.sup.2      21 Br . + CH.sub.4 → H Br + CH.sub.3 .                                                         17.8                                                                               2.6×10.sup.10                                                                 2.7×10.sup.-3                                                                      21.3 15.1                                                                               2.4×10.sup.2                                                                   2×10.sup.3      15 I . + H.sub.2 → HI + H .                                                                    33.4                                                                               9.7×10.sup.10                                                                 4.5×10.sup.-14                                                                     18.6 30.6                                                                               9.6×10.sup.2                                                                   7×10.sup.3      22 2C.sub.2 F.sub.4 → Cyclo C.sub.4 H.sub.8                                                    25.6                                                                               6.6×10.sup.7                                                                  1.5×10.sup.-11                                                                     33.1 22.8                                                                               6.7×10.sup.-1                                                                  4×10.sup.6      23 2 Butadiene → vinylcyclo hexene                                                             23.1                                                                               4.0×10.sup.6                                                                  5.9×10.sup.-11                                                                     38.7 20.3                                                                               3.9×10.sup.-2                                                                  7×10.sup.7      23 Butadiene +  vinylcyclo hexene → trimer                                                     38.0                                                                               1.3×10.sup.11                                                                 2.7×10.sup.-17                                                                     18.0 35.3                                                                               1.3×10.sup.3                                                                   7×10.sup.3      24 HI + RI → HR + I.sub.2                                                  R = CH.sub.3        33.4                                                                               1.6×10.sup.12                                                                 7.4×10.sup.-13                                                                     13.0 30.6                                                                               5.6×10.sup.3                                                                   4×10.sup.2         R = C.sub.2 H.sub.5 29.8                                                                               4.0×10.sup.11                                                                 7.8×10.sup.-11                                                                     15.8 27.1                                                                               4.0×10.sup.3                                                                   8×10.sup.2         R = C.sub.3 H.sub.7 29.8                                                                               1.0×10.sup.11                                                                 1.9×10.sup.-11                                                                     18.6 27.1                                                                               9.7×10.sup.2                                                                   4×10.sup.3      25 NH.sub.3 + NH.sub.3 → N.sub.2 H.sub.4 + H.sub.2                                             49.1                                                                               4.2×10.sup.7                                                                  7.2×10.sup.-29                                                                     34.0 46.4                                                                               2.1×10.sup.0                                                                   2×10.sup.8      __________________________________________________________________________      ##STR9##                                                                       (b) ΔH.sup.+ .sup.+  = E.sub.act  - 2 RT                                 ##STR10##                                                                      (d) E.sub.x obtained from FIG. 9.                                        

Analogous to equation (6) we write ##EQU77## and analogous to (8) ##EQU78## or analogous to (8a), ##EQU79##

The same equations can be used for steady state approximation of [A_(in) ] in the above equation as for equation (9g) provided the reaction ##EQU80## is replaced by ##EQU81## where ##EQU82## and the reaction ##EQU83## is replaced by ##EQU84##

If we define ##EQU85## then equation (45) can be used to obtain I_(opt). Evaluation of [A_(in) ], φ_(A) and E_(x) follow directly: For m level excitation, ##EQU86## and recursively ##EQU87## Thus ##EQU88## Therefore ##EQU89##

Assuming κ_(ij) to be a constant κ' as before, we obtain, analogous to equation (9) ##EQU90##

It follows that ##EQU91## where ##EQU92## and ##EQU93## analogous to equation (9d). It follows, using the same approximations as before, that ##EQU94## To a good approximation ##EQU95## Finally E_(x) can be obtained from an equation analogous to equation (37), i.e. ##EQU96##

The limiting minimal expenditure E_(xlim) in KWH/mole, which would result if all excited molecules reacted, is given by ##EQU97## 12-FIGS. 11-13 have been calculated using the above equations for unimolecular reactions and typical molecular parameters for Arrehenius frequency factors between 10¹² 14 10¹⁵. Even for activation energies of 80 Kcal/mole at room temperature energy expenditures are more favorable than for the most favorable bimolecular reactions. This is because the frequency factors are generally much larger for unimolecular reactions.

Table IV summarizes values for several reactions thought to be unimolecular. It will be noticed that enormous reaction enhancements result for these reactions. Hence unimolecular reactions are expected to predominate in laser induced processes because they will be competitive with thermally favored bimolecular reactions which generally have lower activation energies.

CONCLUSIONS

The reaction 2NH₃ → N₂ H₄ + H₂ was chosen for illustration because it does not take place under thermally equilbrated conditions. High energies of

                                      TABLE IV                                     __________________________________________________________________________     Approximate Expected Rate Enhancements and Energy Expeditures for Some         Unimolecular Reactions at 300° K and 1 atm., Pumped to or Above         ε.sub.0.sup.+.sup.+                                                    __________________________________________________________________________                                Eact  Log.sub.10 (A)                                                                       .sup.K lfe at 300° K                                                           .sup.k lfeφA at                                                            300° K                                                                           Ex                      Ref                                                                               Gaseous Unimolecular Reaction                                                                          Kcal/mole                                                                            A in sec.sup.-1                                                                      sec.sup.-1                                                                            sec.sup.-1                                                                              KWH/mole                __________________________________________________________________________        Cyclo propane → propylene                                                                       65    15.17 6.6×10.sup.-33                                                                   6.3×10.sup.5                                                                     1.2×10.sup.2         Cis isostillbene → trans isostilbene                                                            42.8  12.78 4.0×10.sup.-19                                                                   4.4×10.sup.4                                                                     1.5×10.sup.1         Trans cyanostyrene → Cis cyanostyrene                                                           46    11.8  2.0×10.sup.-22                                                                   4.1×10.sup.3                                                                     1.8×10.sup.1         Vinyl allyl ether → alkylacetaldehyde                                                           30.6  11.27 1.3×10.sup.-11                                                                   2.1×10.sup.4                                                                     1.8×10.sup.0      30.                                                                               Cyclobutene → 1,3 butadiene                                                                     32.5  13.08 2.5×10.sup.-11                                                                   4.0×10.sup.5                                                                     4.7×10.sup.0         CH.sub.3 CH.sub.2 Cl → C.sub.2 H.sub.4 +  HCl                                                   60.8  14.6  2.0×10.sup.-30                                                                   1.9×10.sup.5                                                                     1.3×10.sup.2         CH.sub.3 CHBrCH.sub.3 → CH.sub.3 CH = CH.sub.2                                                  50.7r 13.0  1.2×10.sup.-24                                                                   1.9×10.sup.4                                                                     4.4×10.sup.1         t-Butyl acetate → isobutene + CH.sub.3 COOH                                                     40.5  13.34 6.9×10.sup.-17                                                                   5.3×10.sup.5                                                                     4.7×10.sup.0         CH.sub.3 CH(OOCCH.sub.3).sub.2 → CH.sub.3 CHO + (CH.sub.3               CO).sub.2 O             32.9  10.3  2.2×10.sup.-14                                                                   6.6×10.sup.2                                                                     2.0×10.sup.2         Perfluoro-cyclobutane → 2C.sub.2 F.sub.4                                                        74.1  15.95 9.4×10.sup.-39                                                                   1.0×10.sup.6                                                                     3.8×10.sup.2         N.sub.2 O.sub.4 → 2NO.sub.2                                                                     13    16    3.4×10.sup.6                                                                     1.3×10.sup.10                                                                    3.7×10.sup.-2        φCH.sub.3 → φCH.sub.2 + H .                                                             77.5  12.32 7.3×10.sup.-45                                                                   2.3×10.sup.2                                                                     4.7×10.sup.2         C.sub.2 H.sub.5 OOC.sub.2 H.sub.5 → 2C.sub.2 H.sub.5 O                                          34.1  13.3  2.9×10.sup.-12                                                                   6.3×10.sup.5                                                                     4.7×10.sup.0      __________________________________________________________________________

activation and large negative entropies of activation put most bimolecular reactions in the same category. As illustrated, such reactions should be induced with the proper infrared lasers. Several advantages of both process and fundamental inportance immediately come to mind.

Reactions not normally attainable could be induced and their kinetics and thermodynamics studied.

It should be possible to tailor reactions by exciting the proper chemical bonds.

Isotopes could be efficiently separated by this method.

Energy could be stored in chemical compounds having much higher energy content than the reactants from which they were made.

Reaction mechanisms could be elucidated by laser probing.

Fundamental molecular dynamics could be studied.

As illustrated in this paper, laser pumping of vibrational levels should produce chemical reactions not otherwise attainable. Theoretical calculations suggest that this could have far reaching results on the chemical industry. Some of these "unattainable reactions" may take place with molecules which normally undergo other reactions. For example the normal organic reaction ##STR11## might be replaced by ##STR12## by exciting CH vibrators. This suggests the possibility of tailoring products of given reactants.

If compounds of one isotope can be selectively excited over the corresponding compound of another, then efficient isotopic separation via chemical reaction becomes a possibility.

The storage of Gibb's free energy in chemical compounds formed from compounds of lower Gibb's free energy might be developed into an efficient process. The reaction 2NH₃ → N₂ H₄ is not a practical example of this. However other reactions might be.

Reaction rates are frequently controlled by a slow mechanistic step in a chain of steps. Often this step is postulated but not easily proved. Bathing the reaction with laser frequencies common to the suspected reactant of the slow step should, under appropriate conditions, enhance the reaction until the next slowest step is rate controlling. This step may be studied in a like manner.

Reaction rates of laser-catalysed reactions are dependent on a number of competitive energy-transfer processes between degrees of freedom. One can conceive of a number of laser experiments which would provide a detailed understanding of these processes. In particular, the laser activation of one degree of freedom of a molecular beam before collision would provide a probe to elucidate molecular dynamics.

In the absence of a fast-tuning laser, discrete laser frequencies may be used to pump molecules effectively. Two typical schemes are outlined below. To find these schemes requires a precise knowledge of the energies of hot-band transitions. Recently we have reevaluated the spectroscopic parameters for a number of diatomics so that now we can precisely calculate these hot-band transitions, often with uncertainties less than 0.01 cm⁻¹. This allows us to search for the schemes which can be used to excite molecules into the 4th and 5th vibrational quantum number levels with our laser system, either by simultaneously using two or more laser frequencies, or by using one judiciously chosen frequency to couple between vibration-rotation levels.

FIG. 15 illustrates a scheme for exciting NO to the 5th vibrational state using one frequency (1814.6 cm⁻¹). A CO laser can be made to lase at this frequency. The NO molecule is first pumped to the first vibrational and fifteenth rotational state (1,15) from the zeroeth vibrational and sixteenth rotational state (0,16). By collisional process the ninth rotational state of the first vibrational state is populated. Subsequently, laser pumping takes the molecule to the (2,8) state. The same frequency of the laser with a half band width of 1-2 cm⁻¹ can be used to pump from (1,9) to (2,8) as from (0,16) to (1,15). Subsequent transitions occur as indicated in FIG. 15 by sequential excitation and collisional relaxation.

FIG. 16 illustrates a second scheme, which is adaptable to the system illustrated in FIG. 14. In the apparatus 20 of FIG. 14, a Nd doped YAG laser 21 emits light in one of 13 discrete tuned frequencies ν. In a typical example, in accordance with the scheme in FIG. 16, the 0.9464 micron line (10565 cm⁻¹) is doubled by the frequency doubler 22. A beam consisting of two lasing frequencies (10565 and 21130 cm⁻¹) exits the laser 21. The second of these is modified by passing it through a parametric oscillator 23 held at about 350° C, generating a third infrared beam (2924 cm¹). This frequency is responsible for pumping the H¹ Cl³⁷ isotope of an HCl reaction mixture to the first vibrational level and the second rotational level. The fundamental frequency (10565 cm³¹ 1) is used to pump the molecule on to the 5th vibrational and 3rd rotational level, which are attained despite the low molar absorptivity of the forbidden (1-5) transition. Because of the small volumes which are subjected to this photon flux, a gas chromatographic mass spectrometer typically is used to analyze the reaction mixture. Varying concentrations and photon densities are used to observe changes in rates.

The laser 21 typically comprises a neodymium doped yttria garnet (YAG) rod 21A, an electrooptic Q switch 21B, and a doubling crystal 22 comprising lithium iodate, LiIO₃, or other suitable material. The parametric oscillator 23 typically comprises a non-centrosymmetric crystal, such as lithium niobate, LiNbO₃, having two indices of refraction which can be varied with temperature, thus varying the frequencies 2ν-δ and δ which emit from the parametric oscillator 23. At this point we have four discrete frequencies at any given temperature of the parametric oscillator 23. When other frequencies are desired for the pumping scheme, multiple parametric oscillator or optical dye cavities 23 can be driven by the same laser 21. In the case of n parametric oscillators, the frequencies ν, 2ν, δ_(n), and 2ν-δ_(n) are emitted, where δ_(n) represents the n frequencies, one from each parametric oscillator. When n optical dyes are used, the frequencies ν, 2ν, and δ_(n) are emitted. Those frequencies not wanted to the reaction chamber 24 can be rejected by an appropriate filter 25 and the remaining frequencies can be focused to near the diffraction limit, if need be, within the reaction cell 24 by a long-focal-length lens 26 made of sodium chloride, NaCl, or other appropriate material to transmit the frequencies desired. The focal length of the lens 26 is chosen to be compatible with the power of the laser, the length of the reaction cell 24, and the molar absorptivities of the molecule being excited. For high photon fluxes the lens 26 will have a short focal length, but this must be compatible with the requirement for a sufficiently large confocal parameter to insure passages of laser light through the confines of the reaction cell 24.

The reaction chamber 24 comprises an inlet 27 for reactants and an outlet 28 for products. By using Brewster windows 30 on the cell 24, energy reflection losses can be kept to a minimum. To further improve the utilization of energy, a 100% reflecting mirror 31, typically spherical, and another similar mirror 32, but having a small axial hole 33, cause the radiation admitted through the hole 33 to reflect multiple times through the reaction chamber 24. The reaction products at 28 typically are fed to a gas chromatographic mass spectrometer for analysis, as indicated at 34. The inlet 27 may be arranged to receive not only reactants, as indicated at 35 and 36, but also a gas such as helium, as indicated at 37, for sweeping the reaction chamber 24.

Bimolecular Reactions

The molecule for which intermolecular vibrational relaxation processes are best known is HCl..sup.(8,40,44,45) The rotational constants, fundmanetal vibrational mode, anharmonicities, and dissociation energy are well established. Thus we excite H¹ Cl³⁷ and react it with NO principally because NO is a free radical scavenger. Reactions involved are

    HCl + NO → NOCl + H

    h + no → hno

    hcl + NO → HNO + Cl

    Cl + NO → NOCl

    HNO + HNO → HNO dimer

Hno is only stable in the dimeric form. NO is furnished in large excess to keep the reaction simple.

We are now convinced that upward cascading of vibrational levels by collisional processes such as

    HCl(n) + HCl(m) → HCl(m+p) +  HCl(n-p),

where (n) represents the nth vibrational level, are much more important than originally thought. .sup.(41) Conceivably, they could lead to unimolecular photo-dissociation reactions, i.e.,

    HCl → H. + Cl.

    H. + HCl → H.sub.2 + Cl.

    H. + Cl--H → HCl + H.

    cl. + HCl → HCl + Cl.

    Cl. + HCl → H. + Cl.sub.2

However, Bauer's work .sup.(9) etc., would indicate the preference of four center transition states. To discern these effects, reactions may be studied in mixtures of HCl with DCl. Where the bimolecular reaction is predominant, and HCl is preferentially excited, H₂ is the primary product; otherwise, HD also forms in about equal quantities. It has been verified that coupling with HCl can be accomplished without appreciably coupling to DCl. Furthermore, anharmonicity is not so severe as to prohibit pumping successive levels with the same tuned laser.

Other simple reactions with HCl can also be studied. An example is the rate of substitution of hydrogen in homogeneous gas phase reactions

    D.sub.2 + HCl → HD + DCl

Kinetic data are available for these reactions from single-pulse shock tube measurements. .sup.(45)

Unimolecular Reactions

Unimolecular reactions which haave been measured under thermal equilibrium conditions involve more complicated molecules than are conviently used for bimolecular reactions. Simple unimolecular reactions amenable to study are ##STR13##

The cyclopropane reaction is probably not as ideal for study as is the cyclobutene reaction because its activation energy is about twice that of cyclobutene. Although the cyclobutene molecule is more complex than cyclopropane, it is not appreciably so, having only three more degrees of freedom (24 vs. 21).

A number of fundamental laser experiments can be performed with the cyclobutene molecule. Whether energy deposited in one degree of freedom will affect the isomerization rate more than if it were deposited in another degree has not been experimentally verified. This is a fundamental question relating to unimolecular reaction rate theory and has been the object of much discussion in the past. It is also very important in determining optimal ways to vary reaction products by changing the exciting frequency of the laser.

Since for the butene reaction one hydrogen must transfer from one carbon to an adjacent carbon, one might expect a priori that excitation of the C--H wagging frequency would be more effective than excitation of the C--H stretching frequency in inducing reaction. Measurement of this effect is in order.

Independent measurements of lifetimes of vibrational levels (n > 1) for this molecule will help to answer fundamental questions pertaining to intramolecular relaxation processes and the tailoring of reactions by tuning to different frequencies.

To recapitulate, referring to FIG. 14, in a typical method according to this invention a laser 21A, 21B and a frequency doubler 22 emit radiant energy at frequencies of ν and 2ν into an optical dye within an optical cavity 23 capable of being tuned to a wanted frequency δ, or a parametric oscillator 23 comprising a non-centrosymmetric crystal having two indices of refraction, to emit radiant energy at the frequencies of ν, 2ν, and δ (and, with a parametric oscillator, also at 2ν-δ). These frequencies are adjusted to desired values by selection of the lasing materials, by tuning of the optical cavities, and by controlling the temperature of the parametric oscillator 23. Typically each unwanted frequency is filtered out by the filter 25, and each desired frequency is focused by the lens 26 to the desired radiation flux within a reaction chamber 24 and is reflected repeatedly through the chamber 24 while reactants are fed into the chamber at 27 and reaction products are removed therefrom at 28.

In a typical method for enhancing the reaction of HCl with NO to yield the HNO dimer, a neodymium doped yttria garnet laser 21 provides radiant energy at a frequency of about 10565 cm⁻¹, the radiation frequency is doubled at 22 to about 21130 cm⁻¹, the doubled frequency radiant energy is passed through a crystal of lithium niobate 23 at a temperature of about 350° C and oriented to emit radiant energy at frequencies of about 2924 cm⁻¹ and 18206 cm⁻¹, and the radiant energy at about 10565 cm⁻¹ and 2924 cm⁻¹ is directed through the filter 25 and the lens 26 to the reactants in the chamber 24, in accordance with the HCl³⁷ pumping scheme illustrated in FIG. 16.

In another typical method NO is excited to the 5th vibrational state by radiant energy at a frequency of about 1814.6 cm⁻¹ as illustrated in FIG. 15.

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I claim:
 1. A method of enhancing a selected chemical reaction that comprises increasing the population of a selected high vibrational energy state of a reactant molecule substantially above its population at thermal equilibrium by directing onto the molecule a beam of radiant energy from a laser having a combination of frequency and intensity selected to pump the selected energy state, and carrying out the reaction with the temperature, pressure, and concentrations of reactants maintained at a combination of values selected to optimize the reaction in preference to thermal degradation by transforming the absorbed energy into translational motion, wherein photons are excited from one energy level to a level above the next higher energy level by providing radiant energy having a plurality of selected frequencies from a laser that is tuned rapidly from one selected frequency to another.
 2. A method as in claim 1, wherein the laser is tuned rapidly from higher to lower frequencies corresponding to the vibrational energy levels of the molecule being excited, to successively populate higher vibrational levels of the molecule.
 3. A method as in claim 2, wherein the laser is tuned at a rate comparable to those of the dynamic processes within the molecule leading to depopulation.
 4. A method for enhancing the reaction of HCl with NO to yield the HNO dimer that comprises increasing the population of a selected high vibrational energy state of a reactant molecule substantially above its population at thermal equilibrium by directing onto the molecule a beam of radiant energy having a combination of frequency and intensity selected to pump the selected energy state, and carrying out the reaction with the temperature, pressure, and concentrations of reactants maintained at a combination of values selected to optimize the reaction in preference to thermal degradation by transforming the absorbed energy into translational motion, wherein a neodymium doped yttria garnet laser provides the radiant energy at a frequency of about 10565 cm⁻¹, the radiation frequency is doubled to about 21130 cm⁻¹, the doubled frequency radiant energy is passed through a crystal of lithium niobate at a temperature of about 350° C and oriented to emit radiant energy at frequencies of about 2924 cm⁻¹ and 18206 cm⁻¹, and the radiant energy at about 10565 cm⁻¹ and 2924 cm⁻¹ is directed to the reactants. 